9.7 Higher roots (Page 3/8)

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Simplify: ⓐ $\sqrt[3]{−108}$ ⓑ $\sqrt[4]{−48}$ .

ⓐ $−3 \sqrt[3]{4}$ ⓑ $not real$

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Simplify: ⓐ $\sqrt[3]{−625}$ ⓑ $\sqrt[4]{−324}$ .

ⓐ $−5 \sqrt[3]{5}$ ⓑ $not real$

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Use the quotient property to simplify expressions with higher roots

We can simplify higher roots with quotients in the same way we simplified square roots. First we simplify any fractions inside the radical.

Simplify: ⓐ $\sqrt[3]{\frac{a^{8}}{a^{5}}}$ ⓑ $\sqrt[4]{\frac{a^{10}}{a^{2}}}$ .

Solution

ⓐ
$\begin{matrix} \sqrt[3]{\frac{a^{8}}{a^{5}}} \\ Simplify the fraction under the radical first. & \sqrt[3]{a^{3}} \\ Simplify. & a \end{matrix}$
ⓑ
$\begin{matrix} \sqrt[4]{\frac{a^{10}}{a^{2}}} \\ Simplify the fraction under the radical first. & \sqrt[4]{a^{8}} \\ Rewrite the radicand using perfect fourth power factors. & \sqrt[4]{{(a^{2})}^{4}} \\ Simplify. & a^{2} \end{matrix}$

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Simplify: ⓐ $\sqrt[4]{\frac{x^{7}}{x^{3}}}$ ⓑ $\sqrt[4]{\frac{y^{17}}{y^{5}}}$ .

ⓐ $| x |$ ⓑ $y^{3}$

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Simplify: ⓐ $\sqrt[3]{\frac{m^{13}}{m^{7}}}$ ⓑ $\sqrt[5]{\frac{n^{12}}{n^{2}}}$ .

ⓐ $m^{2}$ ⓑ $n^{2}$

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Previously, we used the Quotient Property ‘in reverse’ to simplify square roots. Now we will generalize the formula to include higher roots.

Quotient property of n Th roots

\begin{matrix} \sqrt[n]{\frac{a}{b}} = \frac{\sqrt[n]{a}}{\sqrt[n]{b}} & and & \frac{\sqrt[n]{a}}{\sqrt[n]{b}} = \sqrt[n]{\frac{a}{b}} \end{matrix}

when $\sqrt[n]{a} and \sqrt[n]{b} are real numbers, b \neq 0, and for any integer n \geq 2$

Simplify: ⓐ $\frac{\sqrt[3]{−108}}{\sqrt[3]{2}}$ ⓑ $\frac{\sqrt[4]{96 x^{7}}}{\sqrt[4]{3 x^{2}}}$ .

Solution

ⓐ
$\begin{matrix} \frac{\sqrt[3]{−108}}{\sqrt[3]{2}} \\ \begin{matrix} Neither radicand is a perfect cube, so use \\ the Quotient Property to write as one radical. \end{matrix} & \sqrt[3]{\frac{−108}{2}} \\ Simplify the fraction under the radical. & \sqrt[3]{−54} \\ \begin{matrix} Rewrite the radicand as a product using \\ perfect cube factors. \end{matrix} & \sqrt[3]{{(−3)}^{3} \cdot 2} \\ Rewrite the radical as the product of two radicals. & \sqrt[3]{{(−3)}^{3}} \cdot \sqrt[3]{2} \\ Simplify. & −3 \sqrt[3]{2} \end{matrix}$
ⓑ
$\begin{matrix} \frac{\sqrt[4]{96 x^{7}}}{\sqrt[4]{3 x^{2}}} \\ \begin{matrix} Neither radicand is a perfect fourth power, \\ so use the Quotient Property to write as one radical. \end{matrix} & \sqrt[4]{\frac{96 x^{7}}{3 x^{2}}} \\ Simplify the fraction under the radical. & \sqrt[4]{32 x^{5}} \\ \begin{matrix} Rewrite the radicand as a product using \\ perfect fourth power factors. \end{matrix} & \sqrt[4]{2^{4} x^{4} \cdot 2 x} \\ Rewrite the radical as the product of two radicals. & \sqrt[4]{{(2 x)}^{4}} \cdot \sqrt[4]{2 x} \\ Simplify. & 2 | x | \sqrt[4]{2 x} \end{matrix}$

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Simplify: ⓐ $\frac{\sqrt[3]{−532}}{\sqrt[3]{2}}$ ⓑ $\frac{\sqrt[4]{486 m^{11}}}{\sqrt[4]{3 m^{5}}}$ .

ⓐ $not real$ ⓑ $3 | m | \sqrt[4]{2 m^{2}}$

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Simplify: ⓐ $\frac{\sqrt[3]{−192}}{\sqrt[3]{3}}$ ⓑ $\frac{\sqrt[4]{324 n^{7}}}{\sqrt[4]{2 n^{3}}}$ .

ⓐ $−4$ ⓑ $3 | n | \sqrt[4]{2}$

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If the fraction inside the radical cannot be simplified, we use the first form of the Quotient Property to rewrite the expression as the quotient of two radicals.

Simplify: ⓐ $\sqrt[3]{\frac{24 x^{7}}{y^{3}}}$ ⓑ $\sqrt[4]{\frac{48 x^{10}}{y^{8}}}$ .

Solution

ⓐ
$\begin{matrix} \sqrt[3]{\frac{24 x^{7}}{y^{3}}} \\ \begin{matrix} The fraction in the radicand cannot be \\ simplified. Use the Quotient Property to \\ write as two radicals. \end{matrix} & \frac{\sqrt[3]{24 x^{7}}}{\sqrt[3]{y^{3}}} \\ \begin{matrix} Rewrite each radicand as a product using \\ perfect cube factors. \end{matrix} & \frac{\sqrt[3]{8 x^{6} \cdot 3 x}}{\sqrt[3]{y^{3}}} \\ Rewrite the numerator as the product of two radicals. & \frac{\sqrt[3]{{(2 x^{2})}^{3}} \sqrt[3]{3 x}}{\sqrt[3]{y^{3}}} \\ Simplify. & \frac{2 x^{2} \sqrt[3]{3 x}}{y} \end{matrix}$
ⓑ
$\begin{matrix} \sqrt[4]{\frac{48 x^{10}}{y^{8}}} \\ \begin{matrix} The fraction in the radicand cannot be \\ simplified. Use the Quotient Property to \\ write as two radicals. \end{matrix} & \frac{\sqrt[4]{48 x^{10}}}{\sqrt[4]{y^{8}}} \\ \begin{matrix} Rewrite each radicand as a product using \\ perfect fourth power factors. \end{matrix} & \frac{\sqrt[4]{16 x^{8} \cdot 3 x^{2}}}{\sqrt[4]{y^{8}}} \\ Rewrite the numerator as the product of two radicals. & \frac{\sqrt[4]{{(2 x^{2})}^{4}} \sqrt[4]{3 x^{2}}}{\sqrt[4]{{(y^{2})}^{4}}} \\ Simplify. & \frac{2 x^{2} \sqrt[4]{3 x^{2}}}{y^{2}} \end{matrix}$

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Simplify: ⓐ $\sqrt[3]{\frac{108 c^{10}}{d^{6}}}$ ⓑ $\sqrt[4]{\frac{80 x^{10}}{y^{5}}}$ .

ⓐ $\frac{3 c^{3} \sqrt[3]{4 c}}{d^{2}}$ ⓑ $\frac{x^{2}}{| y |} \sqrt[4]{\frac{80 x^{2}}{y}}$

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Simplify: ⓐ $\sqrt[3]{\frac{40 r^{3}}{s}}$ ⓑ $\sqrt[4]{\frac{162 m^{14}}{n^{12}}}$ .

ⓐ $r \sqrt[3]{\frac{40}{s}}$ ⓑ $\frac{3 m^{3} \sqrt[4]{2 m^{2}}}{| n^{3} |}$

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Add and subtract higher roots

We can add and subtract higher roots like we added and subtracted square roots. First we provide a formal definition of like radicals .

Like radicals

Radicals with the same index and same radicand are called like radicals .

Like radicals have the same index and the same radicand.

$9 \sqrt[4]{42 x}$ and $−2 \sqrt[4]{42 x}$ are like radicals.
$5 \sqrt[3]{125 x}$ and $6 \sqrt[3]{125 y}$ are not like radicals. The radicands are different.
$2 \sqrt[5]{1000 q}$ and $−4 \sqrt[4]{1000 q}$ are not like radicals. The indices are different.

We add and subtract like radicals in the same way we add and subtract like terms. We can add $9 \sqrt[4]{42 x} + (−2 \sqrt[4]{42 x})$ and the result is $7 \sqrt[4]{42 x}$ .

Simplify: ⓐ $\sqrt[3]{4 x} + \sqrt[3]{4 x}$ ⓑ $4 \sqrt[4]{8} - 2 \sqrt[4]{8}$ .

Solution

ⓐ
$\begin{matrix} \sqrt[3]{4 x} + \sqrt[3]{4 x} \\ The radicals are like, so we add the coefficients. & 2 \sqrt[3]{4 x} \end{matrix}$
ⓑ
$\begin{matrix} 4 \sqrt[4]{8} - 2 \sqrt[4]{8} \\ The radicals are like, so we subtract the coefficients. & 2 \sqrt[4]{8} \end{matrix}$

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Source: OpenStax, Elementary algebra. OpenStax CNX. Jan 18, 2017 Download for free at http://cnx.org/content/col12116/1.2

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